A particle exceutes the motion describes by
`x(t)=x_(0)(1-e^(-gammat)),tge0,x_(0)0`.
The maximum and minimum values of `v(t)` are

A particle executes the motion described by x(t) = x_0 (1-e^(-gammat) , t le 0, x_0 > 0 . Find maximum and minimum vlaues of x(t), v(t), a (t). Show that x (t) and a (t) increase with time and v (t) decreases with time.

A particle executes the motion described by x(f) =x_(0) (1- e ^(lamda t) ) , t ge 0, x_(0) gt 0. (a) Where does the particle start and with what velocity ? (b) Find maximum and minimum values of x(t), v(t), a(t). Show that X(t) and alt) increase with time and v(t) decreases with time.

A particle executes the motion described by x (t)=x_(0) (1-e^(-gamma t)) , t gt =0, x_0 gt 0 . (a) Where does the particle start and with what velocity ? (b) Find maximum and minimum values of x (t) , a (t) . Show that x (t) and a (t) increase with time and v(t) decreases with time.

A particle executes the motion described by x(t) = x_0 (1-e^(-gammat) , t le 0, x_0 > 0 . Where does the particle start and with what velocity?

A particle executes the motion described by x (t) =x_(0) (w-e^(gamma t) , t gt- 0, x_0 gt 0 . (a) Where does the particle start and with what velocity ? (b) Find maximum and minimum values of x (t0 , a (t). Show that x (t) and a (t0 increase with time and v (t) decreases with time.

The position x of a particle at time t is given by : x=(v_(0))/(a)(1-e^(-at)) where v_(0) is a constant and a>0. The dimensional formula of v_(0) and a is :

The position x of a particle at time t is given by x=(V_(0))/(a)(1-e^(-at)) , where V_(0) is constant and a gt 0 . The dimensions of V_(0) and a are

If f(x)=int_(0)^(1)e^(|t-x|)dt where (0<=x<=1) then maximum value of f(x) is

The position of particle at time t is given by, x(t) = (v_(0)//prop) (1-e^(-ut)) where v_(0) is a constant prop gt 0 . The dimension of v_(0) and prop are,

The position of a particle at time t is given by the equation x(t) = V_(0)/A (1-e^(At)) V_(0) = constant and A > 0 Dimensions of V_(0) and A respectively are